Macroscopic phase coherence is one of the most remarkable manifestations of quantum mechanics, yet it seems to be the inevitable ground state of interacting many-body systems. In the last two decades, the familiar examples of superfluid He and conventional superconductors have been joined by exotic and high temperature superconductors, ultra-cold atomic gases, both bosonic and fermionic, and recently systems of excitons, magnons, and exciton-photon superpositions called polaritons, the subject of this talk.
An exciton is the solid-state analogue of positronium, made up of an electron and a hole in a semiconductor, bound together by the Coulomb interaction. The idea that a dense system of electrons and holes would be unstable toward an excitonic (electrical) insulator is one of the key ideas underlying metal-insulator transition physics. The further possibility that an exciton fluid would be a Bose-Einstein condensate was raised over 40 years ago, and has been the subject of an extensive experimental search in a variety of condensed matter systems. Such a condensate would naturally exhibit phase coherence. Lately, some novel experiments with planar optical microcavities make use of the mixing of excitons with photons to create a composite boson called a polariton that has a very light mass, and is thus a good candidate for a high-temperature Bose condensate. Good evidence for spontaneous coherence has now been obtained, though there are special issues to resolve considering the effects of low dimensionality, disorder, strong interactions, and especially strong decoherence associated with decay of the condensate into environmental photons --- since the condensate is a special kind of
Polariton systems also offer an opportunity to use optical pumping to study a system outside equilibrium. Methods of adiabatic rapid passage can be used to populate the energy spectrum, and therefore to excite many body collective modes in analogy to a quantum quench. In extended systems this is predicted to lead to instabilities of the strongly driven phase (Bogoliubov) and amplitude (Higgs) modes.
 For a brief review, see D.Snoke and P.B. Littlewood, "Polariton Condensates", Physics Today, 63, 42-47 (2010).
 J. Keeling, F. M. Marchetti, M. H. Szymanska, P. B. Littlewood, "Collective coherence in planar semiconductor microcavities", Semiconductor Science and Technology, 22, R1-26 (2007).
 R.T. Brierley, P.B. Littlewood, and P.R. Eastham, "Amplitude mode dynamics of polariton condensates", Phys. Rev. Lett. 107, 040401